Question

What is the solution set for `-x^3-2x^2=-x-2`?

Answer 1

The solution set is `x={-2,-1,1}`

Explanation:

`-x^3-2x^2=-x-2`

Multiply the equation times `-1`.

`x^3+2x^2=x+2`

Move all terms to the left side by subtracting `x+2` from both sides.

`x^3+2x^2-x-2=0`

Group the terms into two binomials.

`(x^3+2x^2)-(x+2)`

Factor out `x^2` from the first group.

`x^2(x+2)-(x+2)`

Factor out `(x+2)`.

`(x^2-1)(x+2)`

`(x^2-1)` can be factored as the difference of squares.

`(x^2-1)=(x+1)(x-1)`

The complete factorization of `-x^3-2x^2=-x-2` is `(x+2)(x+1)(x-1)=0`.

Since the factors are equal to zero, we must set each one equal to zero, and solve for `x`.

`x+2=0`
`x=-2`

`x+1=0`
`x=-1`

`x-1=0`
`x=1`

The solution set is `x={-2,-1,1}`